Reference: How to Calculate Time complexity algorithm

I found a good article related to **How to calculate time complexity of any algorithm or program**

The most common metric for calculating time complexity is Big O notation. This removes all constant factors so that the running time can be estimated in relation to N as N approaches infinity. In general you can think of it like this:

```
statement;
```

**Is constant.** The running time of the statement will not change in relation to **N**.

```
for ( i = 0; i < N; i++ )
statement;
```

**Is linear.** The running time of the loop is directly proportional to N. When N doubles, so does the running time.

```
for ( i = 0; i < N; i++ ) {
for ( j = 0; j < N; j++ )
statement;
}
```

**Is quadratic.** The running time of the two loops is proportional to the square of N. When N doubles, the running time increases by **N * N.**

```
while ( low <= high ) {
mid = ( low + high ) / 2;
if ( target < list[mid] )
high = mid - 1;
else if ( target > list[mid] )
low = mid + 1;
else break;
}
```

**Is logarithmic.** The running time of the algorithm is proportional to the number of times N can be divided by 2. This is because the algorithm divides the working area in half with each iteration.

```
void quicksort ( int list[], int left, int right )
{
int pivot = partition ( list, left, right );
quicksort ( list, left, pivot - 1 );
quicksort ( list, pivot + 1, right );
}
```

Is **N * log ( N ).** The running time consists of N loops (iterative or recursive) that are logarithmic, thus the algorithm is a combination of linear and logarithmic.

In general, doing something with every item in one dimension is linear, doing something with every item in two dimensions is quadratic, and dividing the working area in half is logarithmic. There are other Big O measures such as cubic, exponential, and square root, but they're not nearly as common. Big O notation is described as O ( ) where is the measure. The quicksort algorithm would be described as **O ( N * log ( N ) ).**

Note that none of this has taken into account best, average, and worst case measures. Each would have its own Big O notation. Also note that this is a VERY simplistic explanation. Big O is the most common, but it's also more complex that I've shown. There are also other notations such as big omega, little o, and big theta. You probably won't encounter them outside of an algorithm analysis course. ;)

**Edit:**

Now the Question is how did the `log n`

get into the equation:

- For each step, you invoke the algorithm recursively on the first and second half.
- Thus - the total number of steps needed, is the number of times it will take to reach from n to 1 if you devide the problem by 2 each step.

The equation is: n / 2^k = 1. Since 2^logn = n, we get k = logn. So the number of iterations the algorithm requires is O(logn), which will make the algorithm `O(nlogn)`

Also, **big O** notation gives us easy to calculate - platform independent approximation on how will the algorithm behave asymptotically (at infinity), which can divide the "family" of algorithm into subsets of their complexity, and let us compare easily between them.

You can also check out this Question for more reading: Time complexity of the program using recurrence equation